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Paper detail

Composition operators on Gelfand-Shilov classes

We study composition operators on global classes of ultradifferentiable functions of Beurling type invariant under Fourier transform. In particular, for the classical Gelfand-Shilov classes $Σ_d,\ d > 1,$ we prove that a necessary condition for the composition operator $f\mapsto f\circ ψ$ to be well defined is the boundedness of $ψ'.$ We find the optimal index $d'$ for which $C_ψ(Σ_d({\mathbb R}))\subset Σ_{d'}({\mathbb R})$ holds for any non-constant polynomial $ψ.$

preprint2023arXivOpen access
Héctor ArizaCarmen FernándezAntonio Galbis
math.FA
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Héctor ArizaCarmen FernándezAntonio Galbis

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